Tree-width is a well-studied parameter of structures that measures their similarity to a tree. Many important NP-complete problems, such as Boolean satisfiability (SAT), are tractable on bounded tree-width instances. In this paper we focus on the canonical PSPACE-complete problem QBF, the fully-quantified version of SAT. It was shown by Pan and Vardi [LICS 2006] that this problem is PSPACE-complete even for formulas whose tree-width grows extremely slowly. Vardi also posed the question of whether the problem is tractable when restricted to instances of bounded treewidth. We answer this question by showing that QBF on instances with constant tree-width is PSPACE-complete.Peer Reviewe
LNCS n°10929We propose reductions to quantified Boolean formulas (QBF) as a new approach to showing ...
Fra tional hypertree width is a hypergraph measure similar to tree width and hypertree width. Its al...
The reachability problem in component systems is PSPACE-complete. We show here that even the reachab...
Tree-width is a well-studied parameter of structures that measures their similarity to a tree. Many ...
International audienceWe generalize many results concerning the tractability of SAT and #SAT on boun...
Similar to the satisfiability (SAT) problem, which can be seen to be the archetypical problem for NP...
Similar to the satisfiability (SAT) problem, which can be seen to be the archetypical problem for NP...
In spite of the close connection between the evaluation of quantified Boolean formulas (QBF) and pro...
From an empirical point of view, the hardness of quantified Boolean formulas (QBFs), can be characte...
From an empirical point of view, the hardness of quantified Boolean formulas (QBFs), can be characte...
Alekhnovich and Razborov (2002) presented an algorithm that solves SAT on instances φ of size n and ...
Decision procedures for various logics are used as general-purpose solvers in computer science. A pa...
Arbeit an der Bibliothek noch nicht eingelangt - Daten nicht geprüftAbweichender Titel nach Übersetz...
Quantified Boolean Formulas (QBF) extend the canonical NP-complete satisfiability problem by includi...
Propositional Proof Complexity is the area of Computational Complexity that studies the length of pr...
LNCS n°10929We propose reductions to quantified Boolean formulas (QBF) as a new approach to showing ...
Fra tional hypertree width is a hypergraph measure similar to tree width and hypertree width. Its al...
The reachability problem in component systems is PSPACE-complete. We show here that even the reachab...
Tree-width is a well-studied parameter of structures that measures their similarity to a tree. Many ...
International audienceWe generalize many results concerning the tractability of SAT and #SAT on boun...
Similar to the satisfiability (SAT) problem, which can be seen to be the archetypical problem for NP...
Similar to the satisfiability (SAT) problem, which can be seen to be the archetypical problem for NP...
In spite of the close connection between the evaluation of quantified Boolean formulas (QBF) and pro...
From an empirical point of view, the hardness of quantified Boolean formulas (QBFs), can be characte...
From an empirical point of view, the hardness of quantified Boolean formulas (QBFs), can be characte...
Alekhnovich and Razborov (2002) presented an algorithm that solves SAT on instances φ of size n and ...
Decision procedures for various logics are used as general-purpose solvers in computer science. A pa...
Arbeit an der Bibliothek noch nicht eingelangt - Daten nicht geprüftAbweichender Titel nach Übersetz...
Quantified Boolean Formulas (QBF) extend the canonical NP-complete satisfiability problem by includi...
Propositional Proof Complexity is the area of Computational Complexity that studies the length of pr...
LNCS n°10929We propose reductions to quantified Boolean formulas (QBF) as a new approach to showing ...
Fra tional hypertree width is a hypergraph measure similar to tree width and hypertree width. Its al...
The reachability problem in component systems is PSPACE-complete. We show here that even the reachab...